2.1. The MK3 goniometer head

All of the current MX beamlines at the ESRF are equipped with MD2 or MD2M diffractometers (Nurizzo et al., 2006; McCarthy et al., 2009; Flot et al., 2010; de Sanctis et al., 2012). These instruments allow the precise alignment of a crystalline sample with a small X-ray beam and have a measured sphere of confusion (SOC) of approximately 1 µm. Instead of implementing a full κ-goniometer system, a miniature crystal-orientation device with a limited κ-range was designed to minimize potential collisions with other devices. This resulted in the MK3 (Fig. 1), an easily exchangeable goniometer head that is fully compatible with MD2/MD2M diffractometers and SC3 sample changers (Cipriani et al., 2006). The mounting of an MK3 on the MD2/MD2M currently results in an increase in the SOC to approximately 4 µm. The exchangeability allows the mounting of ancillary devices, such as a microspectro­photomoter (McGeehan et al., 2009), which require additional space or the exchange to another goniometer head for plate screening (H. Belrhali, personal communication). There are now 22 MK3s distributed at ten synchrotron facilities worldwide (Table 1).

As with most κ-goniometers, the MK3 has the φ axis mounted on a κ axis, which is limited in range between −10 and 240°. The MK3 is subsequently mounted on the data-collection axis (or ω axis) of the MD2/MD2M, with an angle (α) of 24° between the κ and ω axes (Fig. 1). While this reduction in the α angle reduces the theoretical reciprocal space covered by the MK3 to 47%, it is a collision-free device. Traditional three-axis κ goniometers have the sample-centring stage mounted on the final φ axis so that all three axes intersect at a unique point, thus ensuring that the sample remains centred during an orientation procedure. Contrary to this, the MK3 uses the MD2/MD2M centring stage located before the κ and φ axes. Such inverse-κ systems consequently mean that the sample has to be re-centred after moving the κ or φ angle. To enable the use of such devices by maintaining the sample in the X-ray beam and cryostream, an elegant and automatic translation-correction protocol has been developed (Brock­hauser et al., 2011). In addition, we use the ω axis of the MD2/MD2M for data collection as the φ axis of the MK3 is not sufficiently accurate.

2.2. STrategy for Aligned Crystals (STAC)

In order to facilitate the use of the MK3 on synchrotron-based MX beamlines, a standalone Java-based software suite, STrategy for Aligned Crystals (STAC), was developed. The program is based on object-oriented (OO) design patterns and takes advantage of the cross-platform support of the Java Virtual Machine for execution on different operating systems. The graphical user interface (GUI) elements can also be easily implemented in other Java applications or web applets, thus facilitating their integration with synchrotron data-collection programs such as automateD collectioN of datA (DNA) or Generic Data Acquisition (GDA). The software design has been guided by a few additional constraints: the ability to embed existing scientific codes and applications, flexibility for easy extension with new features or variants, parallel computational support, asynchronous user-request management and support for a variety of hardware implementations found at synchrotrons. Because of all these constraints, the software design does not follow a simple linear program structure. Rather, it provides a `framework' for implementing and incorporating services. This framework groups the various services into `modules' with defined interfaces, as illustrated in Fig. 2. The implementation freedom of the OO interface guarantees flexibility by accepting alternative solutions and inheritance for efficient coding. The plug-in architecture of the modules provides easy run-time access to the implemented services and their variants.

Figure 2 A schematic representation of STAC. The core framework, which can manage input or output information flow (yellow) from/to various external software solutions, is shown in magenta. The GUI interface, with the various `tabs', is shown in blue. The service modules for alignment and strategy calculation as well as for hardware access are shown in green.

Currently, three modules have been defined: an alignment module for alignment calculation, a strategy module for multi-sweep multi-axis data-collection strategy calculations and a hardware module for accessing the underlying kappa instruments such as the MK3. These are illustrated in Fig. 2. Since the implementation of these modules embeds existing scientific codes, the interface also has a declaration method to credit the original author contributions. Current implementations of the alignment module include GONSET from P. Evans (MRC-LMB, Cambridge) and the Python-based XOalign from P. LeGrand (PROXIMA 1, SOLEIL). The Strategy module is implemented using STRATEGY (Ravelli et al., 1997). A configuration file is used to set up the default behaviour of the application by activating and setting up the services as instances of the defined module implementations. The framework automatically manages the whole lifecycle of any service requests, including creation, maintenance (progress monitoring and error handling), control (starting and abortion) and response handling. It supplies a thread-safe environment for asynchronous execution of processes and automatically synchronizes the output to the GUI. STAC can be run as a standalone GUI communicating with relevant beamline-control motors, as shown in Fig. 3, or in a device–server mode. When launched without the GUI front end, the program reads the input `from' and writes the output `to' various xml files using the DNA data model. For proper calculations STAC must have a calibrated kappa instrument model. Hence, the GUI provides easy-to-use wizards for the rotational calibration needed for any alignment calculation and the translational calibration needed to maintain the sample in the X-ray beam and cryostream when changing the orientation on an inverse-κ system (Brock­hauser et al., 2011).

Figure 3 Screenshot of STAC, illustrating how it can be used in either a standalone or a server application mode, such as through the workflow tab in MxCuBE. The STAC GUI shows the `Input for Re-Orientation' tab with the `Anomalous Data Collection' options for a P212121 crystal system.

2.3. STAC alignment procedures

A successful alignment procedure depends on two conditions: the position of the MK3 and sample-centring motors and the initial crystal orientation. The former can be retrieved from the beamline-control software, while the latter requires a simple crystallographic characterization. Enhanced DNA (EDNA) is an online diffraction-characterization and data-collection strategy algorithm that is now widely used (Incardona et al., 2009). We therefore recommend that EDNA, or a similar characterization program such as RAPD, is used to determine the initial orientation of a crystal. STAC can also read all of the commonly used crystallographic orientation-matrix file formats, including those from XDS (Kabsch, 2010) and MOSFLM (Leslie & Powell, 2007). The relevant information can then be retrieved by STAC for the calculation of the alignment protocols in the `Input for Re-Orientation' tab (Fig. 3). At the ESRF, we have now implemented the use of workflows into the beamline-control software MxCuBE (Gabadinho et al., 2010) to facilitate the routine use of crystal-alignment procedures (Brock­hauser et al., 2012). A number of standard options, as shown in Fig. 3, are available and are described below. STAC also contains a simple option to tilt crystals using an on-axis viewer. Note that this is only valid if the κ axis is initially in the plane of the beam and spindle. This option is particularly useful for increasing the data complete­ness by minimizing the `blind' zone of fortuitously aligned crystals (Dauter, 1999).

3.1. A high-energy S-SAD phasing experiment

The ID14-4 MX beamline (McCarthy et al., 2009) at the ESRF is equipped with an ADSC Q315r Mosaic CCD detector (ADSC, Poway, California, USA) and has a maximum peak intensity of 4.5 × 10¹² photons s⁻¹ using a 100 × 100 µm slit size at 13.2 keV or 0.9393 Å. At this energy the theoretical Bijvoet ratio 〈|ΔF^±|〉/〈|F|〉 for crystals of native bovine trypsin, which contains 14 S atoms (12 cysteines in six disulfide bridges and two methionines) and one Ca²⁺ ion, is estimated to be ∼0.8% (Dauter, 2006; Hendrickson & Teeter, 1981). This makes an S-SAD phasing experiment on such a system quite challenging at this energy. We therefore decided to experimentally determine whether a crystal-alignment strategy could facilitate the ab initio phasing of bovine trypsin at 13.2 keV. For this experiment, we collected four independent 360° data sets at two crystal positions on a large (200 × 200 × 1000 µm) rod-shaped crystal (unit-cell parameters a = 54.3, b = 58.1, c = 66.8 Å) with P2₁2₁2₁ space-group symmetry. Each data set was collected at a different crystal orientation: a data set with c* aligned with the rotation axis and three other arbitrary data sets (Table 2) using a 0.1 s exposure and 8% transmission. This resulted in a photon flux of 1.2 × 10¹¹ photons s⁻¹ at the sample position and a total absorbed dose, as calculated using RADDOSE (Murray et al., 2004; Paithankar & Garman, 2010), of 150 kGy per data set. All data were processed and scaled using the XDS suite (Kabsch, 2010) and SCALA (Evans, 2006), are of very high quality (Table 2) and were isomorphous (R_iso of between 2.3 and 3.5%). We then compared the resulting anomalous signal-to-noise ratios calculated using SHELXC and visualized with HKL2MAP v.0.3 (Pape & Schneider, 2004). As expected, the c*-aligned orientation has a much larger signal compared with the other orientations (Fig. 4a). This observation is consistent with the fact that we could unambiguously determine the correct substructure for the aligned data set with SHELXD (Sheldrick, 2008), while attempts with all of the other alignments were unsuccessful (Table 2). A few rounds of solvent flattening with SHELXE using the autotracing routine (Sheldrick, 2010) resulted in a clearly interpretable electron-density map and 194 polyalanine residues were correctly built out of a total of 223. This is despite the c*-aligned orientation having a marginally lower complete­ness (Table 2) owing to the blind zone (Dauter, 1999). Even better results were obtained upon merging the aligned data set with one or more of the other data sets. This is consistent with previous observations that the merging of diffraction data collected from different crystal orientations results in a higher `real redundancy' (Debreczeni et al., 2003). This strategy can be used to minimize any systematic errors acquired during the measurement of a highly redundant diffraction data set from a single crystal orientation.

Table 2 Data collection from a bovine trypsin crystal at 13.2 keV in several orientations and SHELXD/E results Values in parentheses are for the highest resolution shell (1.9–1.8 Å). Alignment (0 0 1) (1 3 1) (0 1 1) (2 1 1) Position of data collection 1 2 2 1 Space group P212121 Unit-cell parameters (Å) a = 54.3, b = 58.1, c = 66.8 No. of images 360 360 360 360 κ (°) 151.1 148.0 50.6 109.7 φ (°) 109.7 146.7 230.4 22.1 Unique reflections 24991 (3560) 25630 (3697) 25614 (3689) 25632 (3698) Completeness (%) 98.1 (97.3) 100.0 (100.0) 99.9 (99.9) 99.9 (100.0) Multiplicity† 14.5 [7.7] 14.2 [7.5] 14.2 [7.6] 14.2 [7.5] 〈I/σ(I)〉 74.8 (35.9) 57.4 (24.4) 65.2 (31.4) 60.0 (31.2) Rmeas‡ (%) 2.7 (7.2) 3.5 (9.4) 3.1 (7.8) 3.5 (7.6) Rp.i.m.§ (%) 0.7 (1.9) 0.9 (2.5) 0.8 (2.0) 0.9 (2.0) Ranom¶ (%) 0.8 0.9 0.8 0.9 Anomalous signal to noise†† 0.94 (0.84) 0.85 (0.79) 0.85 (0.78) 0.83 (0.76) SHELXD  FIND/DSUL 14/6 14/6 14/6 14/6  Resolution for SHELXD‡‡ (Å) 2.3 2.3 2.3 2.3  CCall 22.8 16.0 16.0 19.0  CCweak 11.0 4.4 5.1 9.3  PATFOM 3.3 2.6 2.9 3.1 SHELXE  Solvent content (%) 57 57 57 57  Contrast 0.52 0.49 0.5 0.59  Connectivity 0.78 0.71 0.71 0.73  Pseudo-free CC (%) 72 55.3 53.75 58.8 †Multiplicity of the native and anomalous (in square brackets) data. ‡Rmeas = (hkl) is the multiplicity (N) independent Rmerge. §Rp.i.m. = (hkl) is a precision-indicating R factor. ¶Ranom = is the ratio of the mean anomalous intensity difference to the mean reflection intensity. ††Anomalous signal to noise = is the ratio of the anomalous difference to the noise. ‡‡Resolution used for heavy-atom search.

Figure 4 SHELXC results highlighting the increase in the anomalous signal that can be achieved by measuring an aligned crystal along a twofold axis: (a) for a high-energy (E = 13.2 keV) bovine trypsin S-SAD phasing experiment, (b) for an Se-SAD phasing experiment.

3.2. A selenomethionine SAD phasing experiment

The improvement that can be achieved by aligning a crystal for an ab initio phasing experiment was again demonstrated by solving the structure of a domain of a protein involved in piRNA biogenesis using a selenomethionine-based SAD phasing experiment (Cora et al., unpublished results). This domain of ∼15 kDa crystallized in space group P2₁2₁2₁, with unit-cell parameters a = 35.2, b = 100.8, c = 146.3 Å, and contained four molecules in the asymmetric unit with a solvent content of 41%. Despite the large theoretical Bijvoet ratio 〈|ΔF^±|〉/〈|F|〉 of ∼9% (Hendrickson & Teeter, 1981), it turned out to be a non-straightforward phasing experiment. For the best crystal, we collected two consecutive data sets at the selenium fluorescence peak (12.661 keV) from a single position in two different crystal orientations. The first was collected with the c* axis aligned with the rotation axis and the second was collected in a random orientation. Both data sets were optimized to minimize the φ range needed to measure a complete set of anomalous differences for a particular orientation. We used a 60 × 60 µm slit size to match the crystal size, 30% transmission and a 0.3 s exposure time. This resulted in a photon flux of 3.6 × 10¹¹ photons s⁻¹ at the sample position and a total absorbed dose, as calculated using RADDOSE (Murray et al., 2004; Paithankar & Garman, 2010), of 2.9 MGy per data set. All data were processed and scaled using the XDS suite (Kabsch, 2010) and SCALA (Evans, 2006), are of very high quality (Table 3) and have an R_iso of 9.7%.

Table 3 Data collection and SHELXD and SOLOMON results for an SeMet-substituted domain from a protein involved in piRNA biogenesis collected in two orientations Values in parentheses are for the highest resolution shell (2.95–2.80 Å). Alignment (0 0 1) None Combined Space group P212121 Unit-cell parameters (Å) a = 35.2, b = 100.8, c = 146.3 No. of images 100 100 100 + 100 κ (°) 52.0 0   φ (°) 150.01 0   Unique reflections 13160 (1873) 13576 (1963) 13594 (1948) Completeness (%) 97.8 (96.9) 99.8 (99.5) 100.0 (99.9) Multiplicity† 4.0 [2.2] 3.9 [2.1] 7.7 [4.1] 〈I/σ(I)〉 12.5 (2.4) 10.3 (1.8) 13.7 (2.9) Rmeas‡ (%) 14.5 (78.6) 16.7 (106.8) 16.6 (72.7) Rp.i.m.§ (%) 7.1 (38.0) 8.4 (52.8) 5.9 (32.6) Ranom¶ (%) 10.4 11.7 9.4 Wilson B factor (Å2) 62.7 67.2 60.7 Anomalous signal to noise†† 1.35 (0.72) 1.16 (0.68) 1.45 (0.75) SHELXD  FIND 20 20 20  Resolution for SHELXD‡‡ (Å) 3.3 3.3 3.3  CCall 47.9 33.2 50.8  CCweak 18.8 7.1 18.9  PATFOM 5.2 3.8 4.9 SOLOMON§§  Overall correlation on |E|2 0.41 versus 0.34   0.44 versus 0.35 †Multiplicity of the native and anomalous (in square brackets) data. ‡Rmeas = (hkl) is the multiplicity (N) independent Rmerge. §Rp.i.m. = (hkl) is a precision-indicating R factor. ¶Ranom = is the ratio of the mean anomalous intensity difference to the mean reflection inten­sity. ††Anomalous signal to noise = is the ratio of the anomalous difference to the noise. ‡‡Resolution used for the heavy-atom search. §§The correlation coefficient calculated between the structure-factor amplitudes of the `observed' data and the modified map using SOLOMON (Abrahams & Leslie, 1996) for the correct versus the incorrect hand.

The first thing that we noticed was that the aligned data set contained 2128 (or ∼20% of the total) more Bijvoet pairs compared with the unaligned data set. Perhaps more important is the fact that these reflections also had a larger anomalous signal (Table 3 and Fig. 4b). Similar to the high-energy S-­SAD case described above, we could easily find the heavy-atom sites using the aligned data set alone but not the non-aligned data set (Fig. 5). As we could not obtain good phases with SHELXE (Sheldrick, 2010), we turned to SHARP (de La Fortelle & Bricogne, 1997). The experimental phases calculated using the SAD procedure in SHARP (de La Fortelle & Bricogne, 1997) were further improved using the density-modification package SOLOMON (Abrahams & Leslie, 1996) and resulted in clearly interpretable electron-density maps. Since the randomly oriented data set was collected after the aligned data set, we cannot rule out that radiation damage also contributed to the differences. However, we believe it to be a moderate effect given the low dose used per data set, the small decrease in 〈I/σ(I)〉 and the minor increase in the Wilson B factor (Table 3). In addition, the combined data set resulted in a better experimental map that was used as the starting point for subsequent model building and refinement.

Figure 5 CCall versus CCweak SHELXD plots for the three data sets in Table 3: (a) c* -aligned data set, (b) non-aligned data set, (c) merged data set.

3.3. Space-group determination

The success of any structure determination depends on assigning the correct space group. Most X-ray diffraction data measurements at synchrotron sources preclude the measurement of axial reflections along one or more of the crystallo­graphic axes. In the absence of such experimental information it is often necessary to test multiple space groups in a translational search. However, the ability to easily align a crystal with the MK3 and STAC while it is still mounted can now be used to bring another crystallographic axis into the diffraction condition to enable the measurement of all possible systematic absences. It can even be carried out after the initial data set has been collected and is something that we now routinely use and recommend to all users wishing to solve new structures.

For example, we have recently crystallized a synthetic FAB–receptor complex. We screened several crystals from a single crystallization drop, but only one of these was of sufficient quality for the collection of data. Unfortunately, during the mounting process the crystal was orientated with the c* axis very nearly aligned along the data-collection axis, precluding the measurement of axial reflections along the c* axis (Fig. 6). We nevertheless collected an initial data set according to the EDNA strategy in this random orientation (100 images with a 1° oscillation range). In addition, no systematic absences could be measured along b* because it remained in a plane containing the X-ray beam and perpendicular to the spindle axis, and therefore did not cross the Ewald sphere in the data-collection range used. These reflections could have been measured had the rotation range been extended, but we had already reached the desired completeness. In order to experimentally measure the systematic reflections from b* and c* we decided to use STAC and the MK3 to orient the crystal with the a* axis as close as possible to the rotation axis (an a* alignment was not possible in this case). We then collected another full data set in this orientation (100 images with a 1° oscillation range), allowing us to measure enough systematically absent reflections so that we could unambiguously assign the space group as P2₁2₁2₁ (Fig. 6). This is a very simple routine and while we did not use the second data set for the structural solution and refinement owing to radiation damage, it greatly simplified the molecular-replacement search.

Figure 6 A plot of the axial reflections along a*, b* and c* highlighting how most of the systematic absences can be experimentally measured by collecting data at different orientations.

3.4. Long axis

It has been reported that around 57 full data sets are required for each PDB deposition (Chruszcz et al., 2008). This rather large ratio is presumably a consequence of the various factors that can hinder successful structure solution. Such a high attrition rate is dependent on many factors such as the crystal quality and the need to collect many data sets for experimental phasing. Nevertheless, a large number of these experiments also fail because of poor experimental planning. The introduction of EDNA (Incardona et al., 2009) on the MX beamlines at the ESRF has resulted in an improvement in the data-quality statistics at the ESRF, but there is clearly still scope for further improvement. X-ray-induced radiation damage (Ravelli & Garman, 2006) is widely recognized as a major factor hindering the success of most diffraction experiments, but there are many other common pitfalls, of which one is spot overlap (Dauter, 1999).

To best demonstrate how this hurdle can be overcome using the MK3, we performed two experiments. In the first experiment we deliberately misaligned a thaumatin test crystal, which crystallized in space group P4₁2₁2 with unit-cell parameters a = b = 58.1, c = 150.8 Å, in the sample loop during the mounting and vitrification process. This resulted in the longer c* axis lying nearly perpendicular to the data-collection axis. We then ran a simple EDNA characterization on ID14-4 at a maximal detector resolution of 1.4 Å. This was followed by a `smart spot separation' using the kappa workflow routine (Brockhauser et al., 2012) and another EDNA characterization at the κ angles suggested. The calculation of an optimal EDNA data-collection strategy was performed using BEST (Bourenkov & Popov, 2010), which combines an extensive diffraction analysis with the experimental conditions used for the characterization. One important data-collection parameter calculated is the optimal Δφ necessary for minimizing the number of spot overlaps. This is also presented in an easy-to-interpret plot that is displayed to the user. Such a plot is shown in Fig. 7(a) for the initial `random' orientation superimposed with a plot from the `smart spot separation' orientation suggested by STAC. This comparison clearly shows how the maximal Δφ recommended can be dramatically improved using `smart spot separation'. We also carried out a similar experiment using a 70S ribosome test crystal kindly supplied by the Ramakrishnan laboratory (Selmer et al., 2006), which belonged to space group P2₁2₁2₁ with unit-cell parameters a = 213.5, b = 456.9, c = 626.9 Å, using the recently installed PILATUS 6M detector on ID23-1 (Nurizzo et al., 2006). Here, the maximal detector resolution was set to 3.9 Å and the results are shown in Fig. 7(b). This time BEST produces negative values for the Δφ range in the random orientation, which is indicative of not finding a suitable Δφ to avoid overlaps. This contrasts with the `smart spot separation' routine, which returns a much improved spot separation, as observed by a remarkable increase in the maximal Δφ possible.

Figure 7 Plot of the maximal oscillation width possible to avoid overlapping spots as calculated using BEST (Bourenkov & Popov, 2010) (a) for a deliberately misaligned thaumatin test crystal at 1.4 Å resolution and (b) for a 70S ribosome test crystal at 3.8 Å resolution.

3.5. Other possibilities

Apart from the experimental results shown above, STAC and the MK3 have been used for several other applications. These include plate-shaped crystals, which are particularly prone to deformation during the manual fishing and vitrification steps. Such systems often diffract inhomogeneously; however, by using a small beamsize in combination with a grid or mesh scan the best part (or parts) of the crystal can be identified and used for eventual data collection (Bowler et al., 2010). On MX beamlines with a larger beamsize one can also align the crystal and reduce the horizontal beamsize to minimize the deformed diffraction volume illuminated. This has been effectively used on ID14-4 (McCarthy et al., 2009) and a similar approach can also be used to avoid other defects resulting from intentional or unintentional manipulation during crystal fishing. Another example is when users manage to mount a crystal nearly perfectly parallel in the loop either through design or by accident. Such a near-perfect alignment can result in a less complete data set being collected owing to the `blind zone' (Dauter, 1999). In these situations, we advise users to slightly misalign the crystal using STAC and the MK3 so that a more complete data set can be obtained. Our last example is for biological systems that crystallize as large rod-shaped crystals with one crystal dimension significantly larger than the other two. Here, STAC and the MK3 provide the user with an opportunity to align the spindle with the largest crystal dimension. This allows the maximum diffraction volume of the crystal to be maintained in the X-ray beam. One can then divide the crystal into segments by adjusting the horizontal beamsize and systematically progressing along the crystal. Such a strategy allows one to mitigate against the detrimental effects of radiation damage (Zeldin et al., 2013) and has been extensively used for the collection of many complete high-resolution ribosome data sets on ID14-4 (Schmeing et al., 2009).